Let X be a random variable with a probability distribution P and mean value ${\textstyle \mu =\mathrm {E} [X]}$  (i.e. the first raw moment or moment about zero), the operator E denoting the expected value of X. Then the standardized moment of degree k is ${\displaystyle {\frac {\mu _{k}}{\sigma ^{k}}},}$ ^[2] that is, the ratio of the kth moment about the mean

${\displaystyle \mu _{k}=\operatorname {E} \left[(X-\mu )^{k}\right]=\int _{-\infty }^{\infty }(x-\mu )^{k}P(x)\,dx,}$ 

to the kth power of the standard deviation,

${\displaystyle \sigma ^{k}=\mu _{2}^{k/2}=\left({\sqrt {\mathrm {E} \left[(X-\mu )^{2}\right]}}\right)^{k}.}$ 

The power of k is because moments scale as ${\displaystyle x^{k},}$  meaning that ${\displaystyle \mu _{k}(\lambda X)=\lambda ^{k}\mu _{k}(X):}$  they are homogeneous functions of degree k, thus the standardized moment is scale invariant. This can also be understood as being because moments have dimension; in the above ratio defining standardized moments, the dimensions cancel, so they are dimensionless numbers.

The first four standardized moments can be written as:

For skewness and kurtosis, alternative definitions exist, which are based on the third and fourth cumulant respectively.

Another scale invariant, dimensionless measure for characteristics of a distribution is the coefficient of variation, ${\displaystyle {\frac {\sigma }{\mu }}}$ . However, this is not a standardized moment, firstly because it is a reciprocal, and secondly because ${\displaystyle \mu }$  is the first moment about zero (the mean), not the first moment about the mean (which is zero).

See Normalization (statistics) for further normalizing ratios.

• Coefficient of variation
• Moment (mathematics)
• Central moment
• Standard score § Other normalizations